Fundamental groups of highly symmetrical curves and Fermat line arrangments

Abstract

We showcase a computation of the fundamental group of CP2 - C when C is a curve admitting a lot of symmetries. In particular, let C denote the Fermat line arrangement in CP2 defined by the vanishing locus of homogeneous polynomial (xn-yn)(yn-zn)(zn-xn). In this article, we compute the fundamental group π1(CP2-C) of complement of this line arrangement in the complex projective plane. We show that this group is semi-direct product of G and Fn, i.e., π1(CP2-C, ε) = G Fn, where G and Fn is defined in 4.3, and 1.2 respectively.

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